Remarks on the time-varying H∞ Riccati equations

被引:14
|
作者
Ichikawa, A [1 ]
Katayama, H
机构
[1] Shizuoka Univ, Dept Elect & Elect Engn, Hamamatsu, Shizuoka 4328561, Japan
[2] Osaka Electrocommun Univ, Dept Electromech Engn, Neyagawa, Osaka 5728530, Japan
来源
SYSTEMS & CONTROL LETTERS | 1999年 / 37卷 / 05期
关键词
H-infinity-control; continuous time; discrete time; time-varying; Riccati equations;
D O I
10.1016/S0167-6911(99)00041-9
中图分类号
TP [自动化技术、计算机技术];
学科分类号
0812 ;
摘要
In this paper we establish some useful properties of three Riccati equations appearing in the standard H-infinity-control problems for continuous and discrete-time time-varying systems. We then give necessary and sufficient conditions for the existence of a suboptimal controller by three conditions involving two independent Riccati equations with a coupling inequality. (C) 1999 Elsevier Science B.V. All rights reserved.
引用
收藏
页码:335 / 345
页数:11
相关论文
共 50 条
  • [21] Towards Higher-Order Zeroing Neural Network Dynamics for Solving Time-Varying Algebraic Riccati Equations
    Jerbi, Houssem
    Alharbi, Hadeel
    Omri, Mohamed
    Ladhar, Lotfi
    Simos, Theodore E.
    Mourtas, Spyridon D.
    Katsikis, Vasilios N.
    MATHEMATICS, 2022, 10 (23)
  • [22] Generalized time-varying Riccati theory: A Popov operator based approach
    Ionescu, V
    Stefan, R
    INTEGRAL EQUATIONS AND OPERATOR THEORY, 2004, 48 (02) : 159 - 212
  • [23] Remarks about numerical conditioning of discrete-time Riccati equations
    Suchomski, P
    IEE PROCEEDINGS-CONTROL THEORY AND APPLICATIONS, 2003, 150 (05): : 449 - 456
  • [24] Existence conditions for the stabilizing solution to the time-varying discrete riccati equation
    Ionescu, V
    Oara, C
    PROCEEDINGS OF THE 35TH IEEE CONFERENCE ON DECISION AND CONTROL, VOLS 1-4, 1996, : 2263 - 2264
  • [25] Generalized Time-Varying Riccati Theory: A Popov Operator Based Approach
    Vlad Ionescu
    Radu Stefan
    Integral Equations and Operator Theory, 2004, 48 : 159 - 212
  • [26] H∞ finite time control for discrete time-varying system with interval time-varying delay
    Chen, Menghua
    Sun, Jian
    JOURNAL OF THE FRANKLIN INSTITUTE-ENGINEERING AND APPLIED MATHEMATICS, 2018, 355 (12): : 5037 - 5057
  • [27] Averaging of time-varying differential equations revisited
    Artstein, Zvi
    JOURNAL OF DIFFERENTIAL EQUATIONS, 2007, 243 (02) : 146 - 167
  • [28] On the Stability of Linear Time-Varying Differential Equations
    V. A. Zaitsev
    I. G. Kim
    Proceedings of the Steklov Institute of Mathematics, 2022, 319 : S298 - S317
  • [29] On the stability of linear time-varying differential equations
    Zaitsev, V. A.
    Kim, I. G.
    TRUDY INSTITUTA MATEMATIKI I MEKHANIKI URO RAN, 2022, 28 (03): : 94 - 113
  • [30] On the Stability of Linear Time-Varying Differential Equations
    Zaitsev, V. A.
    Kim, I. G.
    PROCEEDINGS OF THE STEKLOV INSTITUTE OF MATHEMATICS, 2022, 319 (SUPPL 1) : S298 - S317
12345